A History of Mathematics From Mesopotamia to Modernity

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1. Babylonian mathematics


1. On beginnings


Obviously the pioneers and masters of hydraulic society were singularly well equipped to lay the foundations for two
major and interrelated sciences: astronomy and mathematics. (Wittfogel,Oriental Despotism, p. 29, cited Høyrup
1994, p. 47)
Based on intensive cereal agriculture and large-scale breeding of small livestock, all in the hands of a centralized power,
[this civilization] was quickly caught up in a widespread economy which made necessary the meticulous control of
infinite movements, infinitely complicated, of the goods produced and circulated. It was to accomplish this task that
writing developed; indeed for several centuries, this was virtually its only use. (M. Bottéro, cited in Goody 1986, p. 49)


When did mathematics begin? Naive questions like this have their place in history; the answer
is usually a counter-question, in this case, what do you mean by ‘mathematics’? A now rather
outdated view restricts it to the logical-deductive tradition inherited from the Greeks, whose
beginnings are discussed in the next chapter. The problem then is that much interesting work
which we would commonly call ‘mathematics’ is excluded, from the Leibnizian calculus (strong on
calculation but short on proofs) to the kind of exploratory work with computers and fractals which
is now popular in studying complex systems and chaotic behaviour. Many cultures before and since
the Greeks have used mathematical operations from simple counting and measuring onwards,
and solved problems of differing degrees of difficulty; the question is how one draws the line to
demarcate when mathematics proper started, or if indeed it is worth drawing.^1 As we shall see, the
early history of Greek mathematics is hard to reconstruct with certainty. In contrast, the history
of the much more ancient civilizations of Iraq (Sumer, Akkad, Babylon) in the years from 2500 to
1500 bceprovides a quite detailed, if still patchy record of different stages along a route which leads
to mathematics of a kind. Without retracing the whole history in detail, in this chapter we can look
at some of these stages as illustrations of the problem raised by our initial question/questions. Math-
ematics of what kind, and what for? And what are the conditions which seem to have favoured its
development?
Before attempting to answer any of these questions, we need some minimal historical
background. Various civilizations, with different names, followed each other in the region which
is now Iraq, from about 4000 to 300bce(the approximate date of the Greek conquest). Our
evidence about them is entirely archaeological—the artefacts and records which they left, and
which have been excavated and studied by scholars. From a very early date, for whatever reason,
they had, as the quotation from Bottéro describes, developed a high degree of hierarchy, slave or
semi-slave labour, and obsessive bureaucracy, in the service of a combination of kings, gods, and



  1. This relates to the questions raised recently in the field of ‘ethnomathematics’; mathematical practices used, often without
    explicit description or justification, in a variety of societies for differing practical ends from divination to design. For these see, for
    example, Ascher (1991); because the subject is mainly concerned with contemporary societies, it will not be discussed in this book.

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